Title :
Matrix approach to the problem of matrix partitioning
Author :
Stasevich, S.I. ; Koshelev, V.N.
Author_Institution :
Council for Cybern., Acad. of Sci., Moscow, Russia
Abstract :
We derive upper and lower bounds on the number of all variants a rectangular M×N matrix can be partitioned into fragments. Next the problem of matrix partitioning is considered as a particular example of a more general problem of constructing two-dimensional Markov processes (fields) on discrete rectangular lattices. We discuss a matrix-theoretical approach to the problem to explore the structure of discrete fields defined by a given matrix of local interaction
Keywords :
Markov processes; information theory; matrix algebra; discrete fields; discrete rectangular lattices; fragments; local interaction; lower bounds; matrix approach; matrix partitioning; two-dimensional Markov processes; upper bounds; Councils; Cybernetics; Eigenvalues and eigenfunctions; Entropy; Image processing; Information rates; Markov processes; Matrices; Size measurement; Solid state circuits;
Conference_Titel :
Information Theory, 1995. Proceedings., 1995 IEEE International Symposium on
Conference_Location :
Whistler, BC
Print_ISBN :
0-7803-2453-6
DOI :
10.1109/ISIT.1995.531179
